Step-by-step explanation:One approach is to express
Step-by-step explanation:One approach is to express8x/2y
Step-by-step explanation:One approach is to express8x/2yso that the numerator and denominator are expressed with the same base. Since 2 and 8 are both powers of 2, substituting 23 for 8 in the numerator of
Step-by-step explanation:One approach is to express8x/2yso that the numerator and denominator are expressed with the same base. Since 2 and 8 are both powers of 2, substituting 23 for 8 in the numerator of 8x/2y
Step-by-step explanation:One approach is to express8x/2yso that the numerator and denominator are expressed with the same base. Since 2 and 8 are both powers of 2, substituting 23 for 8 in the numerator of 8x/2y gives
Step-by-step explanation:One approach is to express8x/2yso that the numerator and denominator are expressed with the same base. Since 2 and 8 are both powers of 2, substituting 23 for 8 in the numerator of 8x/2y gives(23)x/2y
Step-by-step explanation:One approach is to express8x/2yso that the numerator and denominator are expressed with the same base. Since 2 and 8 are both powers of 2, substituting 23 for 8 in the numerator of 8x/2y gives(23)x/2ywhich can be rewritten
Step-by-step explanation:One approach is to express8x/2yso that the numerator and denominator are expressed with the same base. Since 2 and 8 are both powers of 2, substituting 23 for 8 in the numerator of 8x/2y gives(23)x/2ywhich can be rewritten23x/2y
Step-by-step explanation:One approach is to express8x/2yso that the numerator and denominator are expressed with the same base. Since 2 and 8 are both powers of 2, substituting 23 for 8 in the numerator of 8x/2y gives(23)x/2ywhich can be rewritten23x/2ySince the numerator and denominator of have a common base, this expression can be rewritten as 2(3x−y). In the question, it states that 3x−y=12, so one can substitute 12 for the exponent, 3x−y, which means that
Step-by-step explanation:One approach is to express8x/2yso that the numerator and denominator are expressed with the same base. Since 2 and 8 are both powers of 2, substituting 23 for 8 in the numerator of 8x/2y gives(23)x/2ywhich can be rewritten23x/2ySince the numerator and denominator of have a common base, this expression can be rewritten as 2(3x−y). In the question, it states that 3x−y=12, so one can substitute 12 for the exponent, 3x−y, which means that8x/2y
Step-by-step explanation:One approach is to express8x/2yso that the numerator and denominator are expressed with the same base. Since 2 and 8 are both powers of 2, substituting 23 for 8 in the numerator of 8x/2y gives(23)x/2ywhich can be rewritten23x/2ySince the numerator and denominator of have a common base, this expression can be rewritten as 2(3x−y). In the question, it states that 3x−y=12, so one can substitute 12 for the exponent, 3x−y, which means that8x/2y=212
Step-by-step explanation:One approach is to express
Step-by-step explanation:One approach is to express8x/2y
Step-by-step explanation:One approach is to express8x/2yso that the numerator and denominator are expressed with the same base. Since 2 and 8 are both powers of 2, substituting 23 for 8 in the numerator of
Step-by-step explanation:One approach is to express8x/2yso that the numerator and denominator are expressed with the same base. Since 2 and 8 are both powers of 2, substituting 23 for 8 in the numerator of 8x/2y
Step-by-step explanation:One approach is to express8x/2yso that the numerator and denominator are expressed with the same base. Since 2 and 8 are both powers of 2, substituting 23 for 8 in the numerator of 8x/2y gives
Step-by-step explanation:One approach is to express8x/2yso that the numerator and denominator are expressed with the same base. Since 2 and 8 are both powers of 2, substituting 23 for 8 in the numerator of 8x/2y gives(23)x/2y
Step-by-step explanation:One approach is to express8x/2yso that the numerator and denominator are expressed with the same base. Since 2 and 8 are both powers of 2, substituting 23 for 8 in the numerator of 8x/2y gives(23)x/2ywhich can be rewritten
Step-by-step explanation:One approach is to express8x/2yso that the numerator and denominator are expressed with the same base. Since 2 and 8 are both powers of 2, substituting 23 for 8 in the numerator of 8x/2y gives(23)x/2ywhich can be rewritten23x/2y
Step-by-step explanation:One approach is to express8x/2yso that the numerator and denominator are expressed with the same base. Since 2 and 8 are both powers of 2, substituting 23 for 8 in the numerator of 8x/2y gives(23)x/2ywhich can be rewritten23x/2ySince the numerator and denominator of have a common base, this expression can be rewritten as 2(3x−y). In the question, it states that 3x−y=12, so one can substitute 12 for the exponent, 3x−y, which means that
Step-by-step explanation:One approach is to express8x/2yso that the numerator and denominator are expressed with the same base. Since 2 and 8 are both powers of 2, substituting 23 for 8 in the numerator of 8x/2y gives(23)x/2ywhich can be rewritten23x/2ySince the numerator and denominator of have a common base, this expression can be rewritten as 2(3x−y). In the question, it states that 3x−y=12, so one can substitute 12 for the exponent, 3x−y, which means that8x/2y
Step-by-step explanation:One approach is to express8x/2yso that the numerator and denominator are expressed with the same base. Since 2 and 8 are both powers of 2, substituting 23 for 8 in the numerator of 8x/2y gives(23)x/2ywhich can be rewritten23x/2ySince the numerator and denominator of have a common base, this expression can be rewritten as 2(3x−y). In the question, it states that 3x−y=12, so one can substitute 12 for the exponent, 3x−y, which means that8x/2y=212
Answers & Comments
Step-by-step explanation:
Step-by-step explanation:One approach is to express
Step-by-step explanation:One approach is to express8x/2y
Step-by-step explanation:One approach is to express8x/2yso that the numerator and denominator are expressed with the same base. Since 2 and 8 are both powers of 2, substituting 23 for 8 in the numerator of
Step-by-step explanation:One approach is to express8x/2yso that the numerator and denominator are expressed with the same base. Since 2 and 8 are both powers of 2, substituting 23 for 8 in the numerator of 8x/2y
Step-by-step explanation:One approach is to express8x/2yso that the numerator and denominator are expressed with the same base. Since 2 and 8 are both powers of 2, substituting 23 for 8 in the numerator of 8x/2y gives
Step-by-step explanation:One approach is to express8x/2yso that the numerator and denominator are expressed with the same base. Since 2 and 8 are both powers of 2, substituting 23 for 8 in the numerator of 8x/2y gives(23)x/2y
Step-by-step explanation:One approach is to express8x/2yso that the numerator and denominator are expressed with the same base. Since 2 and 8 are both powers of 2, substituting 23 for 8 in the numerator of 8x/2y gives(23)x/2ywhich can be rewritten
Step-by-step explanation:One approach is to express8x/2yso that the numerator and denominator are expressed with the same base. Since 2 and 8 are both powers of 2, substituting 23 for 8 in the numerator of 8x/2y gives(23)x/2ywhich can be rewritten23x/2y
Step-by-step explanation:One approach is to express8x/2yso that the numerator and denominator are expressed with the same base. Since 2 and 8 are both powers of 2, substituting 23 for 8 in the numerator of 8x/2y gives(23)x/2ywhich can be rewritten23x/2ySince the numerator and denominator of have a common base, this expression can be rewritten as 2(3x−y). In the question, it states that 3x−y=12, so one can substitute 12 for the exponent, 3x−y, which means that
Step-by-step explanation:One approach is to express8x/2yso that the numerator and denominator are expressed with the same base. Since 2 and 8 are both powers of 2, substituting 23 for 8 in the numerator of 8x/2y gives(23)x/2ywhich can be rewritten23x/2ySince the numerator and denominator of have a common base, this expression can be rewritten as 2(3x−y). In the question, it states that 3x−y=12, so one can substitute 12 for the exponent, 3x−y, which means that8x/2y
Step-by-step explanation:One approach is to express8x/2yso that the numerator and denominator are expressed with the same base. Since 2 and 8 are both powers of 2, substituting 23 for 8 in the numerator of 8x/2y gives(23)x/2ywhich can be rewritten23x/2ySince the numerator and denominator of have a common base, this expression can be rewritten as 2(3x−y). In the question, it states that 3x−y=12, so one can substitute 12 for the exponent, 3x−y, which means that8x/2y=212
Verified answer
Step-by-step explanation:
Step-by-step explanation:One approach is to express
Step-by-step explanation:One approach is to express8x/2y
Step-by-step explanation:One approach is to express8x/2yso that the numerator and denominator are expressed with the same base. Since 2 and 8 are both powers of 2, substituting 23 for 8 in the numerator of
Step-by-step explanation:One approach is to express8x/2yso that the numerator and denominator are expressed with the same base. Since 2 and 8 are both powers of 2, substituting 23 for 8 in the numerator of 8x/2y
Step-by-step explanation:One approach is to express8x/2yso that the numerator and denominator are expressed with the same base. Since 2 and 8 are both powers of 2, substituting 23 for 8 in the numerator of 8x/2y gives
Step-by-step explanation:One approach is to express8x/2yso that the numerator and denominator are expressed with the same base. Since 2 and 8 are both powers of 2, substituting 23 for 8 in the numerator of 8x/2y gives(23)x/2y
Step-by-step explanation:One approach is to express8x/2yso that the numerator and denominator are expressed with the same base. Since 2 and 8 are both powers of 2, substituting 23 for 8 in the numerator of 8x/2y gives(23)x/2ywhich can be rewritten
Step-by-step explanation:One approach is to express8x/2yso that the numerator and denominator are expressed with the same base. Since 2 and 8 are both powers of 2, substituting 23 for 8 in the numerator of 8x/2y gives(23)x/2ywhich can be rewritten23x/2y
Step-by-step explanation:One approach is to express8x/2yso that the numerator and denominator are expressed with the same base. Since 2 and 8 are both powers of 2, substituting 23 for 8 in the numerator of 8x/2y gives(23)x/2ywhich can be rewritten23x/2ySince the numerator and denominator of have a common base, this expression can be rewritten as 2(3x−y). In the question, it states that 3x−y=12, so one can substitute 12 for the exponent, 3x−y, which means that
Step-by-step explanation:One approach is to express8x/2yso that the numerator and denominator are expressed with the same base. Since 2 and 8 are both powers of 2, substituting 23 for 8 in the numerator of 8x/2y gives(23)x/2ywhich can be rewritten23x/2ySince the numerator and denominator of have a common base, this expression can be rewritten as 2(3x−y). In the question, it states that 3x−y=12, so one can substitute 12 for the exponent, 3x−y, which means that8x/2y
Step-by-step explanation:One approach is to express8x/2yso that the numerator and denominator are expressed with the same base. Since 2 and 8 are both powers of 2, substituting 23 for 8 in the numerator of 8x/2y gives(23)x/2ywhich can be rewritten23x/2ySince the numerator and denominator of have a common base, this expression can be rewritten as 2(3x−y). In the question, it states that 3x−y=12, so one can substitute 12 for the exponent, 3x−y, which means that8x/2y=212